Treffer: RECONSTRUCTION AND CLUSTERING IN RANDOM CONSTRAINT SATISFACTION PROBLEMS

Title:
RECONSTRUCTION AND CLUSTERING IN RANDOM CONSTRAINT SATISFACTION PROBLEMS
Authors:
MONTANARI, Andrea, RESTREPO, Ricardo, TETALI, Prasad
Source:
SIAM journal on discrete mathematics (Print). 25(1-2):771-808
Publisher Information:
Philadelphia, PA: Society for Industrial and Applied Mathematics, 2011.
Publication Year:
2011
Physical Description:
print, 1 p.1/4
Original Material:
INIST-CNRS
Subject Terms:
Control theory, operational research, Automatique, recherche opérationnelle, Computer science, Informatique, Mathematics, Mathématiques, Sciences exactes et technologie, Exact sciences and technology, Sciences et techniques communes, Sciences and techniques of general use, Mathematiques, Mathematics, Combinatoire. Structures ordonnées, Combinatorics. Ordered structures, Combinatoire, Combinatorics, Théorie des graphes, Graph theory, Algèbre, Algebra, Sciences appliquees, Applied sciences, Informatique; automatique theorique; systemes, Computer science; control theory; systems, Informatique théorique, Theoretical computing, Algorithmique. Calculabilité. Arithmétique ordinateur, Algorithmics. Computability. Computer arithmetics, Algorithme, Algorithm, Algoritmo, Analyse Fourier, Fourier analysis, Análisis Fourier, Contrainte, Constraint, Coacción, Degré liberté, Freedom degree, Grado libertad, Ensemble, Envoi message, Message passing, Expansion, Expansión, Hypergraphe, Hypergraph, Hipergráfico, Mathématiques discrètes, Discrete mathematics, Matemáticas discretas, Reconstruction, Reconstrucción, Seuil, Threshold, Umbral, 05C65, 68Wxx, CSP, Clustering, Graphe coloré, Graphe k-colorable, Problème satisfaction contrainte, SAT, Satisfiabilité, 05C15, 05C80, 68Q87, 82B26, message passing algorithms, random SAT, sharp threshold
Document Type:
Fachzeitschrift Article
File Description:
text
Language:
English
Author Affiliations:
Departments of Electrical Engineering and Statistics, Stanford University, Stanford, CA 94305, United States
School of Mathematics, Georgia Institute of Technology, Atlanta, GA 30332-0160, United States
Departamento de Matematicas, Universidad de Antioquia, Medellin, Colombia
Schools of Mathematics and Computer Science, Georgia Institute of Technology, Atlanta, GA 30332-0160, United States
ISSN:
0895-4801
Access URL:
http://pascal-francis.inist.fr/vibad/index.php?action=search&terms=24520999
Rights:
Copyright 2015 INIST-CNRS
CC BY 4.0
Sauf mention contraire ci-dessus, le contenu de cette notice bibliographique peut être utilisé dans le cadre d’une licence CC BY 4.0 Inist-CNRS / Unless otherwise stated above, the content of this bibliographic record may be used under a CC BY 4.0 licence by Inist-CNRS / A menos que se haya señalado antes, el contenido de este registro bibliográfico puede ser utilizado al amparo de una licencia CC BY 4.0 Inist-CNRS
Notes:
Computer science; theoretical automation; systems

Mathematics
Accession Number:
edscal.24520999
Database:
PASCAL Archive

Weitere Informationen

Random instances of constraint satisfaction problems (CSPs) appear to be hard for all known algorithms when the number of constraints per variable lies in a certain interval. Contributing to the general understanding of the structure of the solution space of a CSP in the satisfiable regime, we formulate a set of technical conditions on a large family of random CSPs and prove bounds on three most interesting thresholds for the density of such an ensemble: namely, the satisfiability threshold, the threshold for clustering of the solution space, and the threshold for an appropriate reconstruction problem on the CSPs. The bounds become asymptoticlally tight as the number of degrees of freedom in each clause diverges. The families are general enough to include commonly studied problems such as random instances of Not-All-Equal SAT, k-XOR formulae, hypergraph 2-coloring, and graph k-coloring. An important new ingredient is a condition involving the Fourier expansion of clauses, which characterizes the class of problems with a similar threshold structure.